geometry hr date: 4/16/2013 - morgan park high school...8.5 ≈ 0.4706 7.5 8.5 ≈ 0.8824 4 7.5 ≈...
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![Page 1: Geometry HR Date: 4/16/2013 - Morgan Park High School...8.5 ≈ 0.4706 7.5 8.5 ≈ 0.8824 4 7.5 ≈ Trig ratios are often expressed as decimal approximations. Ex. 2: Finding Trig Ratios—Find](https://reader034.vdocument.in/reader034/viewer/2022042114/5e9072f72023c7018c7a7d23/html5/thumbnails/1.jpg)
Geometry HR Date: 4/16/2013
Question: How do we measure the immeasurable?
Obj: SWBAT apply properties of 45-45-90 and 30-60-90
triangles.
Bell Ringer: 5 min check 1-4
HW Requests: HR pg 567 #1-12
In class: Red WB pg 101, 102
• HW:Red WB Skills
• Practice 8.4, pg 103
Announcements:
Quiz Wednesday
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Geometry 4/16/13
Obj: SWBAT use trig ratios Question: How do we measure the immeasurable?
Agenda
• Bell Ringer: pg 559 #41, 48
• Special Assignments
• Homework Requests:HR 4th 6th period, Red WB
101,IB 567 #16-27
• Homework: Red WB Skills
• Practice 8.4, pg 103
• Announcements:
• Quiz Wednesday
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Ex. 1: Finding Trig Ratios Large Small
15
817
A
B
C
7.5
48.5
A
B
C
sin A = opposite
hypotenuse
cosA = adjacent
hypotenuse
tanA = opposite
adjacent
8
17 ≈ 0.4706
15
17 ≈ 0.8824
8
15 ≈ 0.5333
4
8.5 ≈ 0.4706
7.5
8.5 ≈ 0.8824
4
7.5 ≈ 0.5333
Trig ratios are often expressed as decimal approximations.
![Page 5: Geometry HR Date: 4/16/2013 - Morgan Park High School...8.5 ≈ 0.4706 7.5 8.5 ≈ 0.8824 4 7.5 ≈ Trig ratios are often expressed as decimal approximations. Ex. 2: Finding Trig Ratios—Find](https://reader034.vdocument.in/reader034/viewer/2022042114/5e9072f72023c7018c7a7d23/html5/thumbnails/5.jpg)
Ex. 1: Finding Trig Ratios Large Small
15
817
A
B
C
7.5
48.5
A
B
C
sin A = opposite
hypotenuse
cosA = adjacent
hypotenuse
tanA = opposite
adjacent
8
17 ≈ 0.4706
15
17 ≈ 0.8824
8
15 ≈ 0.5333
4
8.5 ≈ 0.4706
7.5
8.5 ≈ 0.8824
4
7.5 ≈ 0.5333
Trig ratios are often expressed as decimal approximations.
![Page 6: Geometry HR Date: 4/16/2013 - Morgan Park High School...8.5 ≈ 0.4706 7.5 8.5 ≈ 0.8824 4 7.5 ≈ Trig ratios are often expressed as decimal approximations. Ex. 2: Finding Trig Ratios—Find](https://reader034.vdocument.in/reader034/viewer/2022042114/5e9072f72023c7018c7a7d23/html5/thumbnails/6.jpg)
Ex. 2: Finding Trig Ratios—Find the sine, the
cosine, and the tangent of the indicated angle.
R
sin S = opposite
hypotenuse
cosS = adjacent
hypotenuse
tanS = opposite
adjacent
12
13 ≈ 0.9231
5
13 ≈ 0.3846
12
5 ≈ 2.4
adjacent
opposite12
13 hypotenuse5
R
T S
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Trigonometry is… • A branch of geometry used first by the
Egyptians and Babylonians (Iraq)
• Used extensively is astronomy and building
• Based on ratios between angles in RIGHT
Triangles
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Why is this useful?
• Imagine being an Ancient Egyptian. They
had no calculators, no computers. They
could use one angle and a pyramid’s side
length to find the other side lengths.
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Ex. 3: Finding Trig Ratios—Find the sine, the
cosine, and the tangent of 45
45
sin 45= opposite
hypotenuse
adjacent
hypotenuse
opposite
adjacent
1
hypotenuse1
√2
cos 45=
tan 45=
1
√2 =
√2
2 ≈ 0.7071
1
√2 =
√2
2 ≈ 0.7071
1
1 = 1
Begin by sketching a 45-45-90 triangle. Because all such triangles are similar, you can make calculations simple by choosing 1 as the length of each leg. It follows that the length of the hypotenuse is √2.
45
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Ex. 3: Finding Trig Ratios—Find the sine, the
cosine, and the tangent of 45
45
sin 45= opposite
hypotenuse
adjacent
hypotenuse
opposite
adjacent
1
hypotenuse1
√2
cos 45=
tan 45=
1
√2 =
√2
2 ≈ 0.7071
1
√2 =
√2
2 ≈ 0.7071
1
1 = 1
Begin by sketching a 45-45-90 triangle. Because all such triangles are similar, you can make calculations simple by choosing 1 as the length of each leg. It follows that the length of the hypotenuse is √2.
45
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2
1
Ex. 4: Finding Trig Ratios—Find the sine, the
cosine, and the tangent of 30
30
sin 30= opposite
hypotenuse
adjacent
hypotenuse
opposite
adjacent
√3
cos 30=
tan 30=
√3
2 ≈ 0.8660
1
2 = 0.5
√3
3 ≈ 0.5774
Begin by sketching a 30-60-90 triangle. To make the calculations simple, you can choose 1 as the length of the shorter leg. It follows that the length of the longer leg is √3 and the length of the hypotenuse is 2.
30
√3
1 =
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2
1
Ex. 4: Finding Trig Ratios—Find the sine, the
cosine, and the tangent of 30
30
sin 30= opposite
hypotenuse
adjacent
hypotenuse
opposite
adjacent
√3
cos 30=
tan 30=
√3
2 ≈ 0.8660
1
2 = 0.5
√3
3 ≈ 0.5774
Begin by sketching a 30-60-90 triangle. To make the calculations simple, you can choose 1 as the length of the shorter leg. It follows that the length of the longer leg is √3 and the length of the hypotenuse is 2.
30
√3
1 =
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!IMPORTANT!
To solve trig functions in the calculator,
make sure to set your MODE to DEGREES
• Directions:
Press MODE, arrow down to Radian
Arrow over to Degrees
Press ENTER
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Example:
Find the missing side lengths.
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• We have one angle (30°) and the hypotenuse.
• Which ratios can we use to find the other sides?
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Trig Ratios
For an ∠X Inverse Function
To find trig ratio To find the ∠X
Sin ∠X = Opp Sin-1 Opp = ∠X
Hyp Hyp
Cos ∠X = Adj Cos-1 Adj = ∠X
Hyp Hyp
Tan ∠X =Opp Tan-1 Opp = ∠X
Adj Adj
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ReferenceTriangles
n
n
2n
45
45 1
1
2
45
45
This is our reference triangle for the 45-45-90.
n 2n
30
60
3n
1 2
30
60
3This is our reference triangle for the 30-60-90.
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The Trigonometric Functions
SINE
COSINE
TANGENT
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Pronounced “theta”
Greek Letter q
Represents an unknown angle
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Pronounced “alpha”
Greek Letter α
Represents an unknown angle
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Pronounced “Beta”
Greek Letter β
Represents an unknown angle
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Finding Trig Ratios
• A trigonometric ratio is a ratio of the lengths of two sides of a right triangle. The word trigonometry is derived from the ancient Greek language and means measurement of triangles. The three basic trigonometric ratios are sine, cosine, and tangent, which are abbreviated as sin, cos, and tan respectively.
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Trigonometric Ratios • Let ∆ABC be a right
triangle. The sine,
the cosine, and the
tangent of the acute
angle A are defined
as follows.
ac
bside adjacent to angle A
Side
opposite
angle A
hypotenuse
A
B
C
sin A = Side opposite A
hypotenuse
= a
c
cos A = Side adjacent to A
hypotenuse
= b
c
tan A = Side opposite A
Side adjacent to A
= a
b
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q
opposite hypotenuse
SinOpp
Hyp
adjacent
CosAdj
Hyp
TanOpp
Adj
hypotenuse opposite
adjacent
C B
A
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We could ask for the trig functions of the angle by using the definitions.
a
b
c
You MUST get them memorized. Here is a
mnemonic to help you.
The sacred Jedi word:
SOHCAHTOA
c
b
hypotenuse
oppositesin
adjacentcos
hypotenuse
a
c opposite
tanadjacent
b
a
adjacent
SOHCAHTOA
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It is important to note WHICH angle you are talking
about when you find the value of the trig function.
a
b
c
Let's try finding some trig functions
with some numbers. Remember that
sides of a right triangle follow the
Pythagorean Theorem so
222 cba
Let's choose: 222 5 43 3
4
5
sin = Use a mnemonic and
figure out which sides
of the triangle you
need for sine.
h
o
5
3
tan =
a
o
3
4
adjacent
Use a mnemonic and
figure out which sides
of the triangle you
need for tangent.
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You need to pay attention to which angle you want the trig function
of so you know which side is opposite that angle and which side is
adjacent to it. The hypotenuse will always be the longest side and
will always be opposite the right angle.
This method only applies if you have
a right triangle and is only for the
acute angles (angles less than 90°)
in the triangle.
3
4
5
Oh,
I'm
acute!
So
am I!